Mathematical Methods for Physics and Engineering : A Comprehensive Guide

(Darren Dugan) #1

31.7 HYPOTHESIS TESTING


t

P(t|H 0 )

tcrit

α

t
tcrit

P(t|H 1 )

β

Figure 31.10 The sampling distributionsP(t|H 0 )andP(t|H 1 ) of a test statistic
t. The shaded areas indicate the (one-tailed) regions for which Pr(t>tcrit|H 0 )=
αand Pr(t<tcrit|H 1 )=βrespectively.

random variable. Moreover, given the simple null hypothesisH 0 concerning the


PDF from which the sample was drawn, we may determine (in principle) the


sampling distributionP(t|H 0 ) of the test statistic. A typical example of such a


sampling distribution is shown in figure 31.10. One defines fortarejection region


containing some fractionαof the total probability. For example, the (one-tailed)


rejection region could consist of values oftgreater than some valuetcrit,for


which


Pr(t>tcrit|H 0 )=

∫∞

tcrit

P(t|H 0 )dt=α; (31.106)

this is indicated by the shaded region in the upper half of figure 31.10. Equally,


a (one-tailed) rejection region could consist of values oftless than some value


tcrit. Alternatively, one could define a (two-tailed) rejection region by two values


t 1 andt 2 such that Pr(t 1 <t<t 2 |H 0 )=α. In all cases, if the observed value oft


lies in the rejection region thenH 0 isrejectedatsignificance levelα;otherwiseH 0


isacceptedat this same level.


It is clear that there is a probabilityαof rejecting the null hypothesisH 0

even if it is true. This is called anerror of the first kind. Conversely, anerror


of the second kindoccurs when the hypothesisH 0 is accepted even though it is

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